chapter five some continuous probability distributions
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CHAPTER FIVE
SOME CONTINUOUS PROBABILITY DISTRIBUTIONS
5.1 Normal Distribution:
The probability density function of the normal random variable X, with mean µ and variance σ² is given by:
21( )2 21
( , , ) ,2
X
f x e x
5.1.1 The Normal Curve has the Following Properties:The mode, which is the point on the horizontal axis where the curve is a maximum, occurs at X= µ , (Mode = Median = Mean).
The curve is symmetric about a vertical axis through the mean µ .
The curve has its points of inflection at X= µ ±σ is concave downward if µ -σ <X< µ +σ and is concave upward otherwise.
The normal curve approaches the horizontal axis asymptotically as we proceed in either direction away from the mean.
The total area under the curve and above the horizontal axis is equal to 1.
Definition: Standard Normal Distribution:The distribution of a normal random variable with
mean zero and variance one is called a standard normal distribution denoted by Z≈N(0,1)
Areas under the Normal Curve:
Using the standard normal tables to find the areas under the curve.
( , )
(0,1)
X N
XZ N
The pdf of Z~N(0,1) is given by:
EX (1):Using the tables of the standard normal distribution, find:
( ) ( 2.11)
( ) ( 1.33)
( ) ( 3)
( ) ( 1.2 2.1)
a P Z
b P Z
c P Z
d P Z
Solution:( ) ( 2.11) 0.9826a P Z
( ) ( 1.33) 1 0.0918 0.9082b P Z
( ) ( 3) 0c P Z
( ) ( 1.2 2.1) 0.9821 0.1151 0.867d P Z
EX (2):Using the standard normal tables, find
the area under the curve that lies:A.to the right of Z=1.84 B.to the left of z=2.51C.between z=-1.97 and z=0.86D.at the point z= -2. 15
Solution:A. to the right of Z=1.84 ( 1.84) 1 0.9671 0.0329P Z
B. to the left of z=2.51
( 2.51) 0.9940P Z
C.between z=-1.97 and z=0.86
( 1.97 0.86) 0.8051 0.0244 0.7807P Z
D.at the point z= -2. 15
( 2.15) 0P Z
EX (3):Find the constant K using the tables such
that:(a)
(b)
3015.0)( KZP
4197.0)18.0( ZKP
Solution:(a) 3015.0)( KZP
52.06985.03015.013015.0)( kKZP
(b)
37.2
0089.04197.04286.0
4197.0)18.0(
k
ZKP
EX (4):Given a normal distribution with µ=50 , σ=10 .
Find the probability that X assumes a value between 45 and 62.
Solution: 45 50 62 50(45 62) ( ) ( 0.5 1.2)
10 10
0.8849 0.3085 0.5764
P X P Z P Z
EX(5) :Given a normal distribution with µ=300 , σ=50,
find the probability that X assumes a value greater than 362.
Solution:1075.08925.01
)24.1()50
300362()362(
ZPZPXP
EX (6):Given a normal distribution with µ=40 and σ=6 ,
find the value of X that has:(a) 45% of the area left(b) 14% of the area to the rightSolution: (a) 45% of the area left
( ) 0.45 0.13P Z k k
40( 0.13) 0.45 0.13 0.78 40 39.22
6
XP Z X X
(b) 14% of the area to the right
1 0.14 0.86 1.08k 40
( 1.08) 0.14 1.08 6.48 40 46.486
XP Z X X
Applications of the Normal Distribution:
EX (7):The reaction time of a driver to visual stimulus is normally distributed with a mean of 0.4 second and a standard deviation of 0.05 second.(a) What is the probability that a reaction requires more than 0.5 second?
(b) What is the probability that a reaction requires between 0.4 and 0.5 second?
(c ) Find mean and variance.
Solution:
(a) What is the probability that a reaction requires more than 0.5 second?
0.4, 0.05X X
0.5 0.4( ) ( 0.5) ( ) ( 2)
0.05
1 0.9772 0.0228
a P X P Z P Z
(b) What is the probability that a reaction requires between 0.4 and 0.5 second?
0.4 0.4 0.5 0.4( ) (0.4 0.5) ( )
0.05 0.05
(0 2) 0.9772 0.5 0.4772
b P X P Z
P Z
(c ) Find mean and variance.
2( ) 0.4, 0.0025c
EX (8):The line width of a tool used for semiconductor manufacturing is assumed to be normally distributed with a mean of 0.5 micrometer and a standard deviation of 0.05 micrometer. (a) What is the probability that a line width
is greater than 0.62 micrometer? (b) What is the probability that a line width
is between 0.47 and 0.63 micrometer?
Solution: (a) What is the probability that a line width
is greater than 0.62 micrometer?0.5, 0.05X X
0.62 0.5( ) ( 0.62) ( ) ( 2.4)
0.05
1 0.9918 0.0082
a P x P Z P Z
(b) What is the probability that a line width is between 0.47 and 0.63 micrometer?
0.47 0.5 0.63 0.5( ) (0.47 0.63) ( )
0.05 0.05
( 0.6 2.6) 0.9953 0.2743 0.721
b P X P Z
P Z
Normal Approximation to the Binomial:Theorem:If X is a binomial random variable with mean µ=n p and variance σ²=n p q , then the
limiting form of the distribution of
is the standard normal distribution N(0,1) .
nasqpn
pnXZ
EX (9):The probability that a patient recovers from rare blood disease is 0.4. If 100 people are known to have
contracted this disease, what is the probability that less than 30 survive?
Solution:100 , 0.4 , 0.6
(100)(0.4) 40 ,
(100)(0.4)(0.6) 4.899
30 40( 30) ( ) ( 2.04) 0.0207
4.899
n p q
np
npq
P X P Z P Z
EX (10)A multiple – choice quiz has 200 questions each with 4 possible answers of which only 1 is the correct answer. What is the probability that sheer guess – work yields from 25 to 30 correct answers for 80 of the 200 problems about which the student has no knowledge?
Solution:(80)(0.25) 20 ,
(80)(0.25)(0.75) 3.873
25 20 30 20(25 30) ( ) (1.29 2.58) 0.9951 0.9015 0.0936
3.873 3.873
p np
npq
P X P Z P Z